Wetting transitions for a random line in long-range potential

Abstract

We consider a restricted Solid-on-Solid interface in Z+, subject to a potential V( n) behaving at infinity like -w/n2. Whenever there is a wetting transition as b0 V( 0) is varied, we prove the following results for the density of returns m( b0) to the origin: if w<-3/8, then m( b0) has a jump at b0c; if -3/8<w<1/8, then m( b0) ( b0c-b0) θ /( 1-θ ) where θ =1-1-8w2; if w>1/8, there is no wetting transition.